Yu. N. Fedorov scite author profile

We consider a nonholonomic system describing a rolling of a dynamically nonsymmetric sphere over a fixed sphere without slipping. The system generalizes the classical nonholonomic Chaplygin sphere problem and it is shown to be integrable for one special ratio of radii of the spheres. After a time reparameterization the system becomes a Hamiltonian one and admits a separation of variables and reduction to Abel-Jacobi quadratures. The separating variables that we found appear to be a non-trivial generalization of ellipsoidal (spheroconic) coordinates on the Poisson sphere, which can be useful in other integrable problems.Using the quadratures we also perform an explicit integration of the problem in theta-functions of the new time. *

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Hamiltonization of the generalized Veselova LR system

Fedorov

Jovanović

2009

Regul. Chaot. Dyn.

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Abenda

Fedorov

2000

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An extended Abel–Jacobi map

Braden

Fedorov

2008

Journal of Geometry and Physics

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Abstract. We solve the problem of inversion of an extended Abel-Jacobi mapwhere Ω j1 are (normalised) abelian differentials of the third kind. In contrast to the extensions already studied, this one contains meromorphic differentials having a common pole Q 1 . This inversion problem arises in algebraic geometric description of monopoles, as well as in the linearization of integrable systems on finite-dimensional unreduced coadjoint orbits on loop algebras.

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Yu. N. Fedorov

Various aspects of 𝑛-dimensional rigid body dynamics

Chaplygin ball over a fixed sphere: an explicit integration

Hamiltonization of the generalized Veselova LR system

Untitled

An extended Abel–Jacobi map

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